Answer: The measure of ∠BEC = 50°.
Step-by-step explanation:
Since we have given that
∠BEC is formed inside a circle by two intersecting chords.
and the value of minor arc BD = 94
The value of major arc CA = 166
We need to find the measure of ∠ BEC.
As we know theorem, the angle AEC is equal to half the sum of the intercepted arcs.
We will use to find the intercepted angles when two chords got intersected i.e.
[tex]m\angle AEC=\frac{\text{ Minor arc+ Major arc}}{2}\\\\m\angle AEC=\frac{94+166}{2}\\\\m\angle AEC=\frac{260}{2}\\\\m\angle AEC=130^\circ[/tex]
Since ∠ AEC and ∠BEC are supplementary angles.
So, it becomes,
[tex]\angle AEC+\angle BEC=1806\circ\\\\ 130^\circ+\angle BEC=180\circ\\\\\angle BEC=180^\circ-130^\circ=50^\circ[/tex]
Hence, the measure of ∠BEC = 50°.
